Differential zeros of period integrals and generalized hypergeometric functions
arXiv:1709.00713
Abstract
In this paper, we study the zero loci of local systems of the form $δΠ$, where $Î $ is the period sheaf of the universal family of CY hypersurfaces in a suitable ambient space $X$, and $δ$ is a given differential operator on the space of sections $V^\vee=Î(X,K_X^{-1})$. Using earlier results of three of the authors and their collaborators, we give several different descriptions of the zero locus of $δΠ$. As applications, we prove that the locus is algebraic and in some cases, non-empty. We also give an explicit way to compute the polynomial defining equations of the locus in some cases. This description gives rise to a natural stratification to the zero locus.
35 pages, minor corrections made